Respuesta :
Answer:
[tex]\frac{u^2+3}{-u^3+u^2-2u}u'=\frac{1}{x}[/tex]
Step-by-step explanation:
First step: I'm going to solve our substitution for y:
[tex]u=\frac{y}{x}[/tex]
Multiply both sides by x:
[tex]ux=y[/tex]
Second step: Differentiate the substitution:
[tex]u'x+u=y'[/tex]
Third step: Plug in first and second step into the given equation dy/dx=f(x,y):
[tex]u'x+u=\frac{x(ux)+(ux)^2}{3x^2+(ux)^2}[/tex]
[tex]u'x+u=\frac{ux^2+u^2x^2}{3x^2+u^2x^2}[/tex]
We are going to simplify what we can.
Every term in the fraction on the right hand side of equation contains a factor of [tex]x^2[/tex] so I'm going to divide top and bottom by [tex]x^2[/tex]:
[tex]u'x+u=\frac{u+u^2}{3+u^2}[/tex]
Now I have no idea what your left hand side is suppose to look like but I'm going to keep going here:
Subtract u on both sides:
[tex]u'x=\frac{u+u^2}{3+u^2}-u[/tex]
Find a common denominator: Multiply second term on right hand side by [tex]\frac{3+u^2}{3+u^2}[/tex]:
[tex]u'x=\frac{u+u^2}{3+u^2}-\frac{u(3+u^2)}{3+u^2}[/tex]
Combine fractions while also distributing u to terms in ( ):
[tex]u'x=\frac{u+u^2-3u-u^3}{3+u^2}[/tex]
[tex]u'x=\frac{-u^3+u^2-2u}{3+u^2}[/tex]
Third step: I'm going to separate the variables:
Multiply both sides by the reciprocal of the right hand side fraction.
[tex]u' \frac{3+u^2}{-u^3+u^2-2u}x=1[/tex]
Divide both sides by x:
[tex]\frac{3+u^2}{-u^3+u^2-2u}u'=\frac{1}{x}[/tex]
Reorder the top a little of left hand side using the commutative property for addition:
[tex]\frac{u^2+3}{-u^3+u^2-2u}u'=\frac{1}{x}[/tex]
The expression on left hand side almost matches your expression but not quite so something seems a little off.
